Find the coordinates of the points of equal trisectionof the line segment joining (2,-2)and (-7.4). 2 About the author Hadley
Answer: Given:- A line segment joining the points A(2,−2) and B(−7,4). Let P and Q be the points on AB such that, AP=PQ=QB Therefore, P and Q divides AB internally in the ratio 1:2 and 2:1 respectively. As we know that if a point (h,k) divides a line joining the point (x 1 ,y 1 ) and (x 2 ,y 2 ) in the ration m:n, then coordinates of the point is given as- (h,k)=( m+n mx 2 +nx 1 , m+n my 2 +ny 1 ) Therefore, Coordinates of P=( 1+2 1×(−7)+2×2 , 1+2 1×4+2×(−2) )=(−1,0) Coordinates of Q=( 1+2 2×(−7)+1×2 , 1+2 2×4+1×(−2) )=(−4,2) Therefore, the coordinates of the points of trisection of the line segment joining A and B are (−1,0) and (−4,2). Reply
Answer:
Given:- A line segment joining the points A(2,−2) and B(−7,4).
Let P and Q be the points on AB such that,
AP=PQ=QB
Therefore,
P and Q divides AB internally in the ratio 1:2 and 2:1 respectively.
As we know that if a point (h,k) divides a line joining the point (x
1
,y
1
) and (x
2
,y
2
) in the ration m:n, then coordinates of the point is given as-
(h,k)=(
m+n
mx
2
+nx
1
,
m+n
my
2
+ny
1
)
Therefore,
Coordinates of P=(
1+2
1×(−7)+2×2
,
1+2
1×4+2×(−2)
)=(−1,0)
Coordinates of Q=(
1+2
2×(−7)+1×2
,
1+2
2×4+1×(−2)
)=(−4,2)
Therefore, the coordinates of the points of trisection of the line segment joining A and B are (−1,0) and (−4,2).